Here's the question:
Solve the recurrence by obtaining a theta bound for T(n) given that T(1) = theta(1).
T(n) = n + T(n-3)
T(n) = T(n-6) + (n-3) + n = T(n-9) + (n-6) + (n-3) + n = T(n-(n-1)) + [(n-n) + (n-(n-3)) + (n-(n-6)) + ... + n] = T(1) + [0 + 3 + 6 + ... + n] = theta(1) = 3[1 + 2 + 3 + ... + n/3] = theta(1) + [(n/3)(n/3 + 1)]/2 = theta(1) + (n^2+3n)/6
When I double check to see if the solution fits the recurrence, it doesn't work. Been at this one for a while now; please halp T__T